On a model for the cross-protection of two infectious diseases
作者: Dominic Boyetey , Marc Aerts , Edward Acheampong , Eric Okyere , Niel Hens
DOI:
关键词: Computer science 、 Parameter space 、 Applied mathematics 、 Stability result 、 Joint (geology) 、 Transmission (mechanics) 、 Population 、 MATLAB
摘要: This paper studies the effects of spread two similarly transmitted infectious diseases with cross protection in an unvaccinated population using a basic SEIR model vital dynamics (births and deaths). A Mathematical is built-up to study joint transmission population. The equilibriums these models as well their stabilities are studied. Specifically, stability results for disease-free endemic steady states proven. Finally, numerical simulations carried out Matlab / Mathematica behavior solutions different regions parameter space. Keywords: protection, diseases, equilibria, simulations, modeling
iiste.org
uhasselt.be 参考文章(23)
Joseph P. LaSalle, The stability of dynamical systems ,(1976)
Libin Rong, Zhilan Feng, Alan S. Perelson, Mathematical Modeling of HIV-1 Infection and Drug Therapy Springer Berlin Heidelberg. pp. 87- 131 ,(2008) , 10.1007/978-3-540-76784-8_3
Robert M. May, Roy M. Anderson, Infectious Diseases of Humans: Dynamics and Control ,(1991)
J. R. Gog, B. T. Grenfell, Dynamics and selection of many-strain pathogens Proceedings of the National Academy of Sciences of the United States of America. ,vol. 99, pp. 17209- 17214 ,(2002) , 10.1073/PNAS.252512799
Hai-Feng Huo, Shuai-Jun Dang, Yu-Ning Li, Stability of a Two-Strain Tuberculosis Model with General Contact Rate Abstract and Applied Analysis. ,vol. 2010, pp. 664- 694 ,(2010) , 10.1155/2010/293747
Juan Zhang, Zhien Ma, Global dynamics of an SEIR epidemic model with saturating contact rate Mathematical Biosciences. ,vol. 185, pp. 15- 32 ,(2003) , 10.1016/S0025-5564(03)00087-7
Stephen Wiggins, Introduction to Applied Nonlinear Dynamical Systems and Chaos ,(1989)
Modeling TB and HIV co-infections. Mathematical Biosciences and Engineering. ,vol. 6, pp. 815- 837 ,(2009) , 10.3934/MBE.2009.6.815
Matthew C. Schuette, A qualitative analysis of a model for the transmission of varicella-zoster virus Mathematical Biosciences. ,vol. 182, pp. 113- 126 ,(2003) , 10.1016/S0025-5564(02)00219-5
Konstantin B. Blyuss, Yuliya N. Kyrychko, On a basic model of a two-disease epidemic Applied Mathematics and Computation. ,vol. 160, pp. 177- 187 ,(2005) , 10.1016/J.AMC.2003.10.033